A point P on the ellipse `x^2/25+y^2/9=1` has the eccentric angle `pi/8`. The sum of the distances of P from the two foci is

The foci of the ellipse 25x^2+36y^2=225 are

Find the area of ellipse x^2/6+y^2/25=1 .

P and Q are two points on the ellipse x^2/a^2+y^2/b^2=1 with eccentric angles theta_1 and theta_2 . Find the equation of the locus of the point of intersection of the tangents at P and Q if theta_1+theta_2=pi/2 .

For the ellipse (x ^(2))/(64) + (y^(2))/(28)=1, the eccentricity is

Find the equation of the ellipse in the form x^2/a^2+y^2/b^2=1(a>b) , given : eccentricity is 1/4 and distance between foci is 4.

If a point P on the ellipse x^2/a^2+y^2/b^2=1 is (a cos theta, b sin theta) and S, S' are the foci, then prove that SP*S'P=a^2sin^2theta+b^2cos^2theta .

P is any point on the ellipse x^2/144+y^2/36=1 and S ans S' are foci, then the perimeter of triangle SPS' is :

If the distance of a point of the ellipse x^2/6+y^2/2=1 from the center is 2, then the eccentric angle is

For the ellipse 25 x ^(2) + 9y ^(2) -150x-90y + 225 =0, the eccentricity e =